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Pseudonyms in Cost-Sharing Games Paolo Penna Florian Schoppmann Riccardo Silvestri Peter Widmayer Università di Salerno Stanford University Università di RomaETH Zurich
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Cost-Sharing Games S 1.Which users to service? 2.At which price? Users Service Users willingness to pay
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Cost(s) = Cost-Sharing Games Users Service a bc S Cheat! Users willingness to pay 1 0.6 0.6 1 0.6-0.50 2/3 2/3 2/3 1/2 1/2 1 Identical prices
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Cost-Sharing Games S Users Service Group Strategyproof (GSP): no cheating, even for coalitions Depends on S!! none worse, one better Voluntary Participation, Consumer Sovereinity minimal requirements Budget Balance (BB) : sum payments = total cost
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Mechanisms Mechanisms are (essentially) methods to divide the cost –[Moulin 99, Moulin&Shenker01, Immorlica&Mahdian&Mirrokni05] Different prices do help –[Bleischwitz&Monien&Schoppmann&Tiemann 07] GSP + BB
![Mechanisms Mechanisms are (essentially) methods to divide the cost –[Moulin 99, Moulin&Shenker01, Immorlica&Mahdian&Mirrokni05] Different prices do help –[Bleischwitz&Monien&Schoppmann&Tiemann 07] GSP + BB](http://images.slideplayer.com/17/3388100/slides/slide_5.jpg "Mechanisms Mechanisms are (essentially) methods to divide the cost –[Moulin 99, Moulin&Shenker01, Immorlica&Mahdian&Mirrokni05] Different prices do help –[Bleischwitz&Monien&Schoppmann&Tiemann 07] GSP + BB")
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Different prices b cd 0.6 0.6 1 a bc 1.1 0.6 0.6 1 1/2 1/2 1/2 1/2 1 1 1/2 1/2 Change name! Internet: no identity verificationVirtual identities, pseudonyms GSP + BB [Bleischwitz et al 07] 1/2
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This work a,d b c BB + GSP + Renameproof 1.Symmetric games 2.Deterministic 3.No multiple bids u(a)u(d) Renameproof: no incentive to change your current name (no better utility) = paolo.penna@gmail.com Names a c d b no incentive to change name Are there mechanisms that “resist to pseudonyms”? not GSP a bc random
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Main Results BB + GSP + Renameproof General impossible! Concave only one mechanism Identical prices
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Main Results BB + GSP + Renameproof Identical prices approximate new mechanisms ?! relax Reputationproof use reputation to rank users reputation helps!
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BB + GSP + Renameproof Identical prices S Names S a da d Price does not depend on “a” Price(S) Price(S {a}, a)Price(S {d}, d)
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S BB + GSP + Renameproof Identical prices S Names S a da d Price(S) 3 users:
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BB + GSP + Renameproof Identical prices S Names S a da d 3 users: x1x1 x3x3 x2x2 x1 +x2 + x3 = 1 Cost(3) For all triangles!!
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BB + GSP + Renameproof Identical prices S Names S a da d 3 users: Color edges of complete graph on n nodes s.t. every triangle has weight 1 x1 +x2 + x3 = 14 names: d 1/2 1/4 ab c 1/2
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BB + GSP + Renameproof Identical prices S Names S a da d 3 users: x1 +x2 + x3 = 1 Color edges of complete graph on n nodes s.t. every triangle has weight 1 Only this!! 1/3
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BB + GSP + Renameproof Identical prices S Names S a da d s+1 users: x1 +x2 + x3+x4 = 1 Color the complete hypergraph on n nodes s.t. every (s+1)-subset sums up to 1
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BB + GSP + Renameproof Identical prices apx-“approx” LB( , s) x(S) UB( , s) 1/(s+1) s+1 users: Color the complete hypergraph on n nodes s.t. every (s+1)-subset sums up to 1 x1x1 x3x3 x2x2 1 x1 +x2 + x3 For all triangles!! q [1, ] S U V same same color
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BB + GSP + Renameproof Identical prices apx-“approx” LB( , s) x(S) UB( , s) s+1 users: Color the complete hypergraph on n nodes s.t. every (s+1)-subset sums up to 1 q [1, ] Prices are always bounded… |x(S) – x(S’)| …sometimes “identical” Monocromatic Ramsey Theorem Service
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Main Results BB + GSP + Renameproof Identical prices relax Reputationproof use reputation to rank users reputation helps!
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Renameproof R Names R a da d paolo.penna@gmail.comppenna@gmail.com 5 years ago 2min ago timenewcomer
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Renameproof R Names R a da d Seller: paolo.penna Feedback: 107 Positive Seller: ppenna Feedback: 1 Positive reputation
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Renameproof aNamesa”a’ aReputationa”a’ Not possible worse reputation no better price Reputationproof
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2/3 1/3 1 alow reputation a”a’ GSP + BB high reputation 7 5 1/2 1 5 0 1 1/2
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Reputationproof alow reputation a”a’ GSP + BB high reputation 1 1/2 1/2 1/2 1/2 1
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Conclusions Renameproof mechanisms identical prices randomization concave not obvious new mechanisms? Reputationproof mechanisms better reputation better price Social Cost of Cheap Pseudonyms [Friedman&Resnik 01] Sybil Attacks [Douceur 01, Cheng&Friedman 05] Falsenameproof [Yokoo&Sakurai&Matsubara 04] newcomers vote many timesbid many times
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Conclusions Renameproof mechanisms identical prices randomization Social Cost of Cheap Pseudonyms [Friedman&Resnik 01] Sybil Attacks [Douceur 01, Cheng&Friedman 05] Falsenameproof [Yokoo&Sakurai&Matsubara 04] bid many times 1/3 1/3 1/3 1/2 1/2 1 Public excludable good 1/3 11
![Conclusions Renameproof mechanisms identical prices randomization Social Cost of Cheap Pseudonyms [Friedman&Resnik 01] Sybil Attacks [Douceur 01, Cheng&Friedman 05] Falsenameproof [Yokoo&Sakurai&Matsubara 04] bid many times 1/3 1/3 1/3 1/2 1/2 1 Public excludable good 1/3 11](http://images.slideplayer.com/17/3388100/slides/slide_25.jpg "Conclusions Renameproof mechanisms identical prices randomization Social Cost of Cheap Pseudonyms [Friedman&Resnik 01] Sybil Attacks [Douceur 01, Cheng&Friedman 05] Falsenameproof [Yokoo&Sakurai&Matsubara 04] bid many times 1/3 1/3 1/3 1/2 1/2 1 Public excludable good 1/3 11")
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Thank You
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Randomization? 11 2 1 2 1 a bc 2- 2- 2- 1/3 a bc 3 3 3 2/3 GSP [BMST07] not GSP
![Randomization a bc 2- 2- 2- 1/3 a bc 2/3 GSP [BMST07] not GSP](http://images.slideplayer.com/17/3388100/slides/slide_27.jpg "Randomization a bc 2- 2- 2- 1/3 a bc 2/3 GSP [BMST07] not GSP")
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